Shape derivatives for minima of integral functionals
Abstract
For varying among open bounded sets in , we consider shape functionals defined as the infimum over a Sobolev space of an integral energy of the kind , under Dirichlet or Neumann conditions on . Under fairly weak assumptions on the integrands and , we prove that, when a given domain is deformed into a one-parameter family of domains through an initial velocity field , the corresponding shape derivative of at in the direction of exists. Under some further regularity assumptions, we show that the shape derivative can be represented as a boundary integral depending linearly on the normal component of on . Our approach to obtain the shape derivative is new, and it is based on the joint use of Convex Analysis and Gamma-convergence techniques. It allows to deduce, as a companion result, optimality conditions in the form of conservation laws.
Cite
@article{arxiv.1401.2788,
title = {Shape derivatives for minima of integral functionals},
author = {Bouchitte Guy and Fragala Ilaria and Lucardesi Ilaria},
journal= {arXiv preprint arXiv:1401.2788},
year = {2014}
}
Comments
Mathematical Programming, September 2013